Map projections
Map projections are 2D models of a 3D component curved surface. A map projection (MP) is comprised of
An MP region in the surface of an oblate ellipsoid,
a generating projection, and
an MP range in 2D coordinate-space,
where:
the MP region is a connected subset of the surface of the oblate ellipsoid,
the MP range is a connected replete set, and
the generating projection is one-to-one from the region of the oblate ellipsoid onto its MP range and its inverse function is smooth and orientation preserving.
NOTE 1 This definition may be generalized to any ellipsoid including tri-axial ellipsoids, but this International Standard only addresses map projections for oblate ellipsoids.
NOTE 2 The domain of a map projection is always a proper sub-set of the oblate ellipsoid surface. For example the domain of the Mercator map projection (see Table 5 .18) omits the pole points.
The generating projection P is specified in terms of surface geodetic CS coordinates. The component functions P1 and P2 of the generating projection P are called the mapping equations:
|
|
��
|
where:
|
|
��
��
|
The MP range coordinate components u and v are called easting and northing respectively. The positive direction of the u-axis (the easting axis) is called map-east. The positive direction of the v-axis (the northing axis) is called map-north.
The inverse mapping equations are the component functions Q1 and Q2 of the inverse generating projection :
|
|
��
��
|
Share with your friends: |
